题目
对于 (50%) 的数据,(1<=n<=1000,1<=p<=300)
对于 (100%) 的数据,(1<=n<=50000,1<=p<=100000,1<=x<=n,0<=k<=1000)
分析
树上子树加的操作让我们联想到线段树的区间加
然后我们就可以用 (dfs) 序把子树弄到序列里
于是考虑怎么加
记根节点深度为 (0)
那么让整个子树加 (k-dep_x),再有的贡献就是一个节点的深度乘上被加的次数
于是线段树维护即可
(Code)
#include<cstdio>
#define LL long long
#define ls (k << 1)
#define rs (ls | 1)
using namespace std;
const int N = 5e4 + 5;
int n , p , dfc , tot , dfn[N] , dep[N] , siz[N] , h[N] , rev[N];
LL d[N] , sum[N * 4] , tag_s[N * 4] , tag_c[N * 4];
struct edge{
int to , nxt;
}e[N];
inline void add(int x , int y){e[++tot] = edge{y , h[x]} , h[x] = tot;}
void dfs(int x)
{
dfn[x] = ++dfc , rev[dfc] = x , siz[x] = 1;
for(register int i = h[x]; i; i = e[i].nxt)
{
int v = e[i].to;
dep[v] = dep[x] + 1;
dfs(v);
siz[x] += siz[v];
}
}
void pushdown(int l , int r , int k)
{
if (tag_s[k] == 0 && tag_c[k] == 0) return;
int mid = (l + r) >> 1;
sum[ls] += tag_s[k] * (mid - l + 1) + tag_c[k] * (d[mid] - d[l - 1]);
tag_s[ls] += tag_s[k] , tag_c[ls] += tag_c[k];
sum[rs] += tag_s[k] * (r - mid) + tag_c[k] * (d[r] - d[mid]);
tag_s[rs] += tag_s[k] , tag_c[rs] += tag_c[k];
tag_s[k] = tag_c[k] = 0;
}
void update(int l , int r , int k , int tl , int tr , int v)
{
if (tl <= l && r <= tr)
{
sum[k] += 1LL * (r - l + 1) * v + (d[r] - d[l - 1]);
tag_s[k] += v , tag_c[k] += 1;
return;
}
pushdown(l , r , k);
int mid = (l + r) >> 1;
if (tl <= mid) update(l , mid , ls , tl , tr , v);
if (tr > mid) update(mid + 1 , r , rs , tl , tr , v);
sum[k] = sum[ls] + sum[rs];
}
LL query(int l , int r , int k , int tl , int tr)
{
if (tl <= l && r <= tr) return sum[k];
pushdown(l , r , k);
int mid = (l + r) >> 1;
LL res = 0;
if (tl <= mid) res += query(l , mid , ls , tl , tr);
if (tr > mid) res += query(mid + 1 , r , rs , tl , tr);
return res;
}
int main()
{
freopen("truetears.in" , "r" , stdin);
freopen("truetears.out" , "w" , stdout);
scanf("%d%d" , &n , &p);
int x , y;
for(register int i = 2; i <= n; i++) scanf("%d" , &x) , add(x , i);
dfs(1);
for(register int i = 1; i <= dfc; i++) d[i] = d[i - 1] + dep[rev[i]];
char opt[5];
for(register int i = 1; i <= p; i++)
{
scanf("%s" , opt);
if (opt[0] == 'A')
{
scanf("%d%d" , &x , &y);
update(1 , n , 1 , dfn[x] , dfn[x] + siz[x] - 1 , y - dep[x]);
}
else {
scanf("%d" , &x);
printf("%lld
" , query(1 , n , 1 , dfn[x] , dfn[x] + siz[x] - 1));
}
}
}